Proposal for the dimensionally consistent treatment of angle and solid angle by the International System of Units (SI)

A recent letter [1] proposed changing the dimensionless status of the radian and steradian within the SI, while allowing the continued use of the convention to set the angle 1 radian equal to the number 1 within equations, providing this is done explicitly. This would bring the advantages of a physics-based, consistent, and logically-robust unit system, with unambiguous units for all physical quantities, for the first time, while any upheaval to familiar equations and routine practice would be minimised. More details of this proposal are given here. The only notable changes for typical end-users would be: improved units for the quantities torque, angular momentum and moment of inertia; a statement of the convention accompanying some familiar equations; and the use of different symbols for the action and the angular momentum, a small step forward for quantum physics. Some features of the proposal are already established practice for quantities involving the steradian such as radiant intensity and radiance.

Section: Discussionmentioning

confidence: 99%

Section: Note Added After Submissionmentioning

confidence: 99%

Section: Note Added After Submissionmentioning

confidence: 99%

See 1 more Smart Citation

Angles in the SI: a detailed proposal for solving the problem

Quincey¹

2021

“…Recommendation 1 of the CIPM 1980 was not accepted positively by all, see, for example, [5]. Recently, an increasing number of researchers come to the idea that the plane angle is a dimensional quantity, and the radian is not a dimensionless number one [6][7][8][9][10][11]. In [10], proceeding from the laws of physics and using rigorous mathematical calculations, it was shown that the plane angle does not depend on any physical quantity, has its own nonzero dimension, which, following [5,11], we will denote by the symbol A.…”

Section: Introductionmentioning

confidence: 99%

“…Recently, an increasing number of researchers come to the idea that the plane angle is a dimensional quantity, and the radian is not a dimensionless number one [6][7][8][9][10][11]. In [10], proceeding from the laws of physics and using rigorous mathematical calculations, it was shown that the plane angle does not depend on any physical quantity, has its own nonzero dimension, which, following [5,11], we will denote by the symbol A. This approach is fully consistent with the metrological rules for determining the dimensions of derived quantities and their units [3].…”

Section: Introductionmentioning

confidence: 99%

Angular frequency in the International System of Units. Physicist’s view

Kalinin

2021

Currently, in the International System of Units (SI), reciprocal second (s −1 ) and radian per second (rad s −1 ) are the units of frequency ν and angular frequency ω, respectively. At the same time, these quantities are related in the SI by the simple mathematical relationship ω = 2πν. And here an evident conflict between this relation and the dimensions of the quantities included in it arises. When using the units in question, the two sides of this relation have different dimensions, which is not admissible in either physics or metrology. However, this situation has existed in metrology for many years. In 2019, the angular frequency with unit rad s −1 was included in the SI brochure. This article analyzes the reasons that have led to this conflict and establishes the relationship between frequency, angular frequency and angular velocity. An example of a simple oscillatory system shows that ω and ν have the same dimension, inverse to the dimension of the time. Therefore, they are measured by the same unit s −1 . This does not coincide with the current definition of the unit of angular frequency in the SI, but fully corresponds to the laws of physics and removes the contradiction in the relation ω = 2πν. It is also shown that the angular frequency and angular velocity are independent quantities of different dimensions.

Comment on ‘Angles in the SI: a detailed proposal for solving the problem’

Leonard¹

2022

Self Cite

Paul Quincey makes a compelling argument for recognizing angle as a base quantity with the radian as the base unit. Solid angle is then a derived quantity with the steradian a derived unit equal to one square radian. The author demonstrates how the familiar equations of the SI appear to result from ‘setting the radian equal to one’—the so-called radian convention. He claims, but without any physical foundation (other than by analogy with translational motion), that, for rotation, the ‘improved’ units for torque, angular momentum and moment of inertia must be J/rad, J/(rad/s) and J/(rad/s)2, respectively, and that the conventional units (N m, kg m2 s–1 and kg m2) result from application of the radian convention to these quantities. However, based on sound physical principles, I demonstrate here that the radian convention is simply a (confusing) change of notation, applicable (only) to angle and its time derivatives. It does not apply to torque, angular momentum or moment of inertia. Analogies can be helpful in identifying relationships between quantities, but they do not dictate the physics. The appropriate units for torque, angular momentum and moment of inertia are, respectively, the well-established angle-independent units: newton metre, kilogram metre-squared per second and kilogram metre-squared.